Graphs whose indecomposability graph is 2-covered

Abstract

Given a graph G=(V,E), a subset X of V is an interval of G provided that for any a, b∈ X and x∈ V X, \a,x\∈ E if and only if \b,x\∈ E. For example, , \x\(x∈ V) and V are intervals of G, called trivial intervals. A graph whose intervals are trivial is indecomposable; otherwise, it is decomposable. According to Ille, the indecomposability graph of an undirected indecomposable graph G is the graph I(G) whose vertices are those of G and edges are the unordered pairs of distinct vertices \x,y\ such that the induced subgraph G[V \x,y\] is indecomposable. We characterize the indecomposable graphs G whose I(G) admits a vertex cover of size 2.